Evaluating Improper Integral: 6/(5x-2) from -∞ to 0

[frasifrasi]

Regarding the integral from -infinity to 0

of 6/(5x-2)


--> I arrive at 6/5*ln(u), is this the right thing?

How would I evaluate something like ln(-2), or do I just assume it is divergent since it the other limit will come out to neg infinity?

 

[quasar987]

You have made the change of variables

\int_{-\infty}^{0}\frac{6}{5x-2}dx = \frac{6}{5}\int_{-\infty}^{-2}\frac{du}{u}

But obviously, it's not true that ln(u) is an antiderivative of 1/u on the domain (-\infinity,-2) simply because ln(u) is not defined there. So your change of variable was not so useful. Try u=2-5x.

 

[frasifrasi]

wait, do you mean 5x - 2?

 

[Hurkyl]

ln(u) is not the antiderivative of 1/u over the nonzero reals. ln(u) is a simplification that is only valid for positive u.

 

[frasifrasi]

So, what substitution should I use?

 

[Dick]

So, what substitution should I use?

Hurkyl is trying to get you to recall ln(|u|) is also an antiderivative for 1/u.

 

[frasifrasi]

I am still unsure wth I should do -- u-subs or what?

Thank you.

 

[Dick]

I am still unsure wth I should do -- u-subs or what?

Thank you.

You already did the u-subs correctly. The antiderivative is (6/5)*ln(|5x-2|). Now you just have to think what happens if you put the limits in.

 

[quasar987]

wait, do you mean 5x - 2?

No, I mean 2-5x. Try it.

 

[frasifrasi]

where did that come from, though?

 

[quasar987]

it comes from choosing a change of coordinate such that the bounds of the integral become positive, so that now ln(u) is an antiderivative to the integrand.

 

[frasifrasi]

But how was that derived, can anyone explain?

 

[quasar987]

Because with u(x)=5x-2, the upper bound of the intregral became -2. So using u(x) = -(5x-2), instead, it becomes -(-2)=2

 

[HallsofIvy]

If u is negative, |u|= -u. Since, on this range, 5x-2 is negative, |5x-2|= 2- 5x.